X-Git-Url: http://matita.cs.unibo.it/gitweb/?a=blobdiff_plain;f=matita%2Fmatita%2Flib%2Fturing%2Funiversal%2Fcompare.ma;h=1db3089cc952abcb160af2814ae62425a641f7de;hb=0a8212f3e87b75e8ab47dc853e612a9a3e1d2544;hp=4b29f4cf48698e4c814083c59d536ce28292397e;hpb=544aa49f420b6049bc9419bf7d2c20b781293ca7;p=helm.git diff --git a/matita/matita/lib/turing/universal/compare.ma b/matita/matita/lib/turing/universal/compare.ma index 4b29f4cf4..1db3089cc 100644 --- a/matita/matita/lib/turing/universal/compare.ma +++ b/matita/matita/lib/turing/universal/compare.ma @@ -103,6 +103,85 @@ lemma sem_atmr_step : ] qed. +(* +definition R_adv_to_mark_r ≝ λalpha,test,t1,t2. + ∀ls,c,rs. + t1 = mk_tape alpha ls c rs → + (c = None ? ∧ t2 = t1) ∨ + (∃c'.c = Some ? c' ∧ + ((test c' = true ∧ t2 = t1) ∨ + (test c' = false ∧ + (((∀x.memb ? x rs = true → test x = false) ∧ + t2 = mk_tape ? (reverse ? rs@c'::ls) (None ?) []) ∨ + (∃rs1,b,rs2.rs = rs1@b::rs2 ∧ + test b = true ∧ (∀x.memb ? x rs1 = true → test x = false) ∧ + t2 = midtape ? (reverse ? rs1@c'::rs) b rs2))))). + +definition adv_to_mark_r ≝ + λalpha,test.whileTM alpha (atmr_step alpha test) 2. + +lemma wsem_adv_to_mark_r : + ∀alpha,test. + WRealize alpha (adv_to_mark_r alpha test) (R_adv_to_mark_r alpha test). +#alpha #test #t #i #outc #Hloop +lapply (sem_while … (sem_atmr_step alpha test) t i outc Hloop) [%] +-Hloop * #t1 * #Hstar @(star_ind_l ??????? Hstar) +[ #tapea * #Htapea * + [ #H1 #ls #c #rs #H2 >H2 in H1; whd in ⊢ (??%? → ?); + #Hfalse destruct (Hfalse) + | * #a * #Ha #Htest #ls #c #rs cases c + [ #Htapea' % % // >Htapea % + | #c' #Htapea' %2 @(ex_intro ?? c') % // + cases (true_or_false (test c')) #Htestc + [ % % // >Htapea % + | %2 % // generalize in match Htapea'; -Htapea' + cases rs + [ #Htapea' % % + [ normalize #x #Hfalse destruct (Hfalse) + | Htapea' % + + + #H2 % + >H2 in Ha; whd in ⊢ (??%? → ?); #Heq destruct (Heq) % // Htapea' in Htapea; #Htapea destruct (Htapea) %2 % // + generalize in match Htapeb; -Htapeb + generalize in match Htapea'; -Htapea' + cases rs + [ #Htapea #Htapeb % % + [ #x0 normalize #Hfalse destruct (Hfalse) + | normalize in Htapeb; cases (IH + + + [//] + cases (true_or_false (test c)) + [ #Htestc % + + + [ #Htapea %2 % [ %2 // ] + #rs #Htapea %2 + + + * + [ #b #rs2 #Hrs >Hrs in Htapeb; #Htapeb #Htestb #_ + cases (IH … Htapeb) + [ * #_ #Houtc >Houtc >Htapeb % + | * #Hfalse >Hfalse in Htestb; #Htestb destruct (Htestb) ] + | #r1 #rs1 #b #rs2 #Hrs >Hrs in Htapeb; #Htapeb #Htestb #Hmemb + cases (IH … Htapeb) + [ * #Hfalse >(Hmemb …) in Hfalse; + [ #Hft destruct (Hft) + | @memb_hd ] + | * #Htestr1 #H1 >reverse_cons >associative_append + @H1 // #x #Hx @Hmemb @memb_cons // + ] + ] +qed. *) + definition R_adv_to_mark_r ≝ λalpha,test,t1,t2. ∀ls,c,rs. (t1 = midtape alpha ls c rs → @@ -115,7 +194,7 @@ definition R_adv_to_mark_r ≝ λalpha,test,t1,t2. definition adv_to_mark_r ≝ λalpha,test.whileTM alpha (atmr_step alpha test) 2. -lemma sem_adv_to_mark_r : +lemma wsem_adv_to_mark_r : ∀alpha,test. WRealize alpha (adv_to_mark_r alpha test) (R_adv_to_mark_r alpha test). #alpha #test #t #i #outc #Hloop @@ -151,43 +230,281 @@ qed. lemma terminate_adv_to_mark_r : ∀alpha,test. - ∀t. (* ∀b,a,ls,rs. t = midtape alpha (a::ls) b rs → - (b = sep ∨ memb ? sep rs = true) → *) - Terminate alpha (adv_to_mark_r alpha test) t. + ∀t.Terminate alpha (adv_to_mark_r alpha test) t. #alpha #test #t @(terminate_while … (sem_atmr_step alpha test)) [ % - | % #t1 whd in ⊢ (% → ?); * #ls * #c * #rs - * * generalize in match c; generalize in match ls; - -ls -c elim rs - [ #ls #c #Ht #Hc #Ht1 - % >Ht1 #t2 * #ls0 * #c0 * #rs0 * * - normalize in ⊢ (%→?); #Hfalse destruct (Hfalse) - - - #Ht #Hc #t1 - elim t - [ % #a whd in ⊢ (% → ?); - - #sep #t #b #a #ls #rs #Ht #Hsep -@(terminate_while … (sem_mcc_step alpha sep)) - [% - |generalize in match Hsep; -Hsep - generalize in match Ht; -Ht - generalize in match ls; -ls - generalize in match a; -a - generalize in match b; -b - generalize in match t; -t - elim rs - [#t #b #a #ls #Ht #Hsep % #tinit - whd in ⊢ (%→?); #H @False_ind - cases (H … Ht) #Hb #_ cases Hb #eqb @eqb - cases Hsep // whd in ⊢ ((??%?)→?); #abs destruct - |#r0 #rs0 #Hind #t #b #a #ls #Ht #Hsep % #tinit - whd in ⊢ (%→?); #H - cases (H … Ht) #Hbsep #Htinit - @(Hind … Htinit) cases Hsep - [#Hb @False_ind /2/ | #Hmemb cases (orb_true_l … Hmemb) - [#eqsep %1 >(\P eqsep) // | #H %2 //] + | cases t + [ % #t1 * #ls0 * #c0 * #rs0 * * #Hfalse destruct (Hfalse) + |2,3: #a0 #al0 % #t1 * #ls0 * #c0 * #rs0 * * #Hfalse destruct (Hfalse) + | #ls #c #rs generalize in match c; -c generalize in match ls; -ls + elim rs + [#ls #c % #t1 * #ls0 * #c0 * #rs0 * * + #H1 destruct (H1) #Hc0 #Ht1 normalize in Ht1; + % #t2 * #ls1 * #c1 * #rs1 * * >Ht1 + normalize in ⊢ (%→?); #Hfalse destruct (Hfalse) + | #r0 #rs0 #IH #ls #c % #t1 * #ls0 * #c0 * #rs0 * * + #H1 destruct (H1) #Hc0 #Ht1 normalize in Ht1; + >Ht1 @IH + ] + ] + ] +qed. + +lemma sem_adv_to_mark_r : + ∀alpha,test. + Realize alpha (adv_to_mark_r alpha test) (R_adv_to_mark_r alpha test). +/2/ +qed. + +(* NO OPERATION + + t1 = t2 + *) + +definition nop_states ≝ initN 1. + +definition nop ≝ + λalpha:FinSet.mk_TM alpha nop_states + (λp.let 〈q,a〉 ≝ p in 〈q,None ?〉) + O (λ_.true). + +definition R_nop ≝ λalpha.λt1,t2:tape alpha.t2 = t1. + +lemma sem_nop : + ∀alpha.Realize alpha (nop alpha) (R_nop alpha). +#alpha #intape @(ex_intro ?? 1) @ex_intro [| % normalize % ] +qed. + +(* + q0 _ → q1, R + q1 〈a,false〉 → qF, 〈a,true〉, N + q1 〈a,true〉 → qF, _ , N + qF _ → None ? + *) + +definition mark_states ≝ initN 3. + +definition mark ≝ + λalpha:FinSet.mk_TM (FinProd … alpha FinBool) mark_states + (λp.let 〈q,a〉 ≝ p in + match a with + [ None ⇒ 〈2,None ?〉 + | Some a' ⇒ match q with + [ O ⇒ 〈1,Some ? 〈a',R〉〉 + | S q ⇒ match q with + [ O ⇒ let 〈a'',b〉 ≝ a' in + 〈2,Some ? 〈〈a'',true〉,N〉〉 + | S _ ⇒ 〈2,None ?〉 ] ] ]) + O (λq.q == 2). + +definition R_mark ≝ λalpha,t1,t2. + ∀ls,c,d,b,rs. + t1 = midtape (FinProd … alpha FinBool) ls c (〈d,b〉::rs) → + t2 = midtape ? (c::ls) 〈d,true〉 rs. + +(*lemma mark_q0_q1 : + ∀alpha,ls,c,rs. + step alpha (mark alpha) + (mk_config ?? 0 (midtape … ls c rs)) = + mk_config alpha (states ? (mark alpha)) 1 + (midtape … (ls a0 rs).*) + +lemma sem_mark : + ∀alpha.Realize ? (mark alpha) (R_mark alpha). +#alpha #intape @(ex_intro ?? 3) cases intape +[ @ex_intro + [| % [ % | #ls #c #d #b #rs #Hfalse destruct ] ] +|#a #al @ex_intro + [| % [ % | #ls #c #d #b #rs #Hfalse destruct ] ] +|#a #al @ex_intro + [| % [ % | #ls #c #d #b #rs #Hfalse destruct ] ] +| #ls #c * + [ @ex_intro [| % [ % | #ls0 #c0 #d0 #b0 #rs0 #Hfalse destruct ] ] + | * #d #b #rs @ex_intro + [| % [ % | #ls0 #c0 #d0 #b0 #rs0 #H1 destruct (H1) % ] ] ] ] +qed. + +include "turing/if_machine.ma". + +(* TEST CHAR + + stato finale diverso a seconda che il carattere + corrente soddisfi un test booleano oppure no + + q1 = true or no current char + q2 = false +*) + +definition tc_states ≝ initN 3. + +definition test_char ≝ + λalpha:FinSet.λtest:alpha→bool. + mk_TM alpha tc_states + (λp.let 〈q,a〉 ≝ p in + match a with + [ None ⇒ 〈1, None ?〉 + | Some a' ⇒ + match test a' with + [ true ⇒ 〈1,None ?〉 + | false ⇒ 〈2,None ?〉 ]]) + O (λx.notb (x == 0)). + +definition Rtc_true ≝ + λalpha,test,t1,t2. + ∀c. current alpha t1 = Some ? c → + test c = true ∧ t2 = t1. + +definition Rtc_false ≝ + λalpha,test,t1,t2. + ∀c. current alpha t1 = Some ? c → + test c = false ∧ t2 = t1. + +lemma tc_q0_q1 : + ∀alpha,test,ls,a0,rs. test a0 = true → + step alpha (test_char alpha test) + (mk_config ?? 0 (midtape … ls a0 rs)) = + mk_config alpha (states ? (test_char alpha test)) 1 + (midtape … ls a0 rs). +#alpha #test #ls #a0 #ts #Htest normalize >Htest % +qed. + +lemma tc_q0_q2 : + ∀alpha,test,ls,a0,rs. test a0 = false → + step alpha (test_char alpha test) + (mk_config ?? 0 (midtape … ls a0 rs)) = + mk_config alpha (states ? (test_char alpha test)) 2 + (midtape … ls a0 rs). +#alpha #test #ls #a0 #ts #Htest normalize >Htest % +qed. + +lemma sem_test_char : + ∀alpha,test. + accRealize alpha (test_char alpha test) + 1 (Rtc_true alpha test) (Rtc_false alpha test). +#alpha #test * +[ @(ex_intro ?? 2) + @(ex_intro ?? (mk_config ?? 1 (niltape ?))) % + [ % // #_ #c normalize #Hfalse destruct | #_ #c normalize #Hfalse destruct (Hfalse) ] +| #a #al @(ex_intro ?? 2) @(ex_intro ?? (mk_config ?? 1 (leftof ? a al))) + % [ % // #_ #c normalize #Hfalse destruct | #_ #c normalize #Hfalse destruct (Hfalse) ] +| #a #al @(ex_intro ?? 2) @(ex_intro ?? (mk_config ?? 1 (rightof ? a al))) + % [ % // #_ #c normalize #Hfalse destruct | #_ #c normalize #Hfalse destruct (Hfalse) ] +| #ls #c #rs @(ex_intro ?? 2) + cases (true_or_false (test c)) #Htest + [ @(ex_intro ?? (mk_config ?? 1 ?)) + [| % + [ % + [ whd in ⊢ (??%?); >tc_q0_q1 // + | #_ #c0 #Hc0 % // normalize in Hc0; destruct // ] + | * #Hfalse @False_ind @Hfalse % ] + ] + | @(ex_intro ?? (mk_config ?? 2 (midtape ? ls c rs))) + % + [ % + [ whd in ⊢ (??%?); >tc_q0_q2 // + | #Hfalse destruct (Hfalse) ] + | #_ #c0 #Hc0 % // normalize in Hc0; destruct (Hc0) // + ] ] +] +qed. + +axiom myalpha : FinSet. +axiom is_bar : FinProd … myalpha FinBool → bool. +axiom is_grid : FinProd … myalpha FinBool → bool. +definition bar_or_grid ≝ λc.is_bar c ∨ is_grid c. +axiom bar : FinProd … myalpha FinBool. +axiom grid : FinProd … myalpha FinBool. + +definition mark_next_tuple ≝ + seq ? (adv_to_mark_r ? bar_or_grid) + (ifTM ? (test_char ? is_bar) + (mark ?) (nop ?) 1). + +definition R_mark_next_tuple ≝ + λt1,t2. + ∀ls,c,rs1,rs2. + (* c non può essere un separatore ... speriamo *) + t1 = midtape ? ls c (rs1@grid::rs2) → + memb ? grid rs1 = false → bar_or_grid c = false → + (∃rs3,rs4,d,b.rs1 = rs3 @ bar :: rs4 ∧ + memb ? bar rs3 = false ∧ + Some ? 〈d,b〉 = option_hd ? (rs4@grid::rs2) ∧ + t2 = midtape ? (bar::reverse ? rs3@c::ls) 〈d,true〉 (tail ? (rs4@grid::rs2))) + ∨ + (memb ? bar rs1 = false ∧ + t2 = midtape ? (reverse ? rs1@c::ls) grid rs2). + +axiom tech_split : + ∀A:DeqSet.∀f,l. + (∀x.memb A x l = true → f x = false) ∨ + (∃l1,c,l2.f c = true ∧ l = l1@c::l2 ∧ ∀x.memb ? x l1 = true → f c = false). +(*#A #f #l elim l +[ % #x normalize #Hfalse *) + +theorem sem_mark_next_tuple : + Realize ? mark_next_tuple R_mark_next_tuple. +#intape +lapply (sem_seq ? (adv_to_mark_r ? bar_or_grid) + (ifTM ? (test_char ? is_bar) (mark ?) (nop ?) 1) ????) +[@sem_if // +| // +|||#Hif cases (Hif intape) -Hif + #j * #outc * #Hloop * #ta * #Hleft #Hright + @(ex_intro ?? j) @ex_intro [|% [@Hloop] ] + -Hloop + #ls #c #rs1 #rs2 #Hrs #Hrs1 #Hc + cases (Hleft … Hrs) + [ * #Hfalse >Hfalse in Hc; #Htf destruct (Htf) + | * #_ #Hta cases (tech_split ? is_bar rs1) + [ #H1 lapply (Hta rs1 grid rs2 (refl ??) ? ?) + [ (* Hrs1, H1 *) @daemon + | (* bar_or_grid grid = true *) @daemon + | -Hta #Hta cases Hright + [ * #tb * whd in ⊢ (%→?); #Hcurrent + @False_ind cases(Hcurrent grid ?) + [ #Hfalse (* grid is not a bar *) @daemon + | >Hta % ] + | * #tb * whd in ⊢ (%→?); #Hcurrent + cases (Hcurrent grid ?) + [ #_ #Htb whd in ⊢ (%→?); #Houtc + %2 % + [ (* H1 *) @daemon + | >Houtc >Htb >Hta % ] + | >Hta % ] + ] + ] + | * #rs3 * #c0 * #rs4 * * #Hc0 #Hsplit #Hrs3 + % @(ex_intro ?? rs3) @(ex_intro ?? rs4) + lapply (Hta rs3 c0 (rs4@grid::rs2) ???) + [ #x #Hrs3' (* Hrs1, Hrs3, Hsplit *) @daemon + | (* bar → bar_or_grid *) @daemon + | >Hsplit >associative_append % ] -Hta #Hta + cases Hright + [ * #tb * whd in ⊢ (%→?); #Hta' + whd in ⊢ (%→?); #Htb + cases (Hta' c0 ?) + [ #_ #Htb' >Htb' in Htb; #Htb + generalize in match Hsplit; -Hsplit + cases rs4 in Hta; + [ >(eq_pair_fst_snd … grid) + #Hta #Hsplit >(Htb … Hta) + >(?:c0 = bar) + [ @(ex_intro ?? (\fst grid)) @(ex_intro ?? (\snd grid)) + % [ % [ % [ (* Hsplit *) @daemon |(*Hrs3*) @daemon ] | % ] | % ] + | (* Hc0 *) @daemon ] + | #r5 #rs5 >(eq_pair_fst_snd … r5) + #Hta #Hsplit >(Htb … Hta) + >(?:c0 = bar) + [ @(ex_intro ?? (\fst r5)) @(ex_intro ?? (\snd r5)) + % [ % [ % [ (* Hc0, Hsplit *) @daemon | (*Hrs3*) @daemon ] | % ] + | % ] | (* Hc0 *) @daemon ] ] | >Hta % ] + | * #tb * whd in ⊢ (%→?); #Hta' + whd in ⊢ (%→?); #Htb + cases (Hta' c0 ?) + [ #Hfalse @False_ind >Hfalse in Hc0; + #Hc0 destruct (Hc0) + | >Hta % ] +]]]] qed. \ No newline at end of file